1 New Numerical Results for the Optimization of Neumann Eigenvalues
2 Transient Convection-Diffusion-Reaction Problems with Variable Velocity Field by Means of DRBEM with Different Radial Basis Functions
3 On a Parametric Representation of the Angular Neutron Flux in the Energy Range from 1 eV to 10MeV
4 A Boundary Integral Equation Formulation for Advection–Diffusion–Reaction Problems with Point Sources
5 Displacement Boundary Value Problem for a Thin Plate in an Unbounded Domain
6 A Dirichlet Spectral Problem in Domains Surrounded by Thin Stiff and Heavy Bands
7 Spectral Homogenization Problems in Linear Elasticity with Large Reaction Terms Concentrated in Small Regions of the Boundary
8 The Mathematical Modelling of the Motion of Biological Cells in Response to Chemical Signals
9 Numerical Calculation of Interior Transmission Eigenvalues with Mixed Boundary Conditions
10 An Inequality for H¨older Continuous Functions Generalizing a Result of CarloMiranda
11 Two-Phase Three-Component Flow in PorousMedia:Mathematical Modeling of Dispersion-Free Pressure Behavior
12 Error Analysis and the Role of Permutation in Dynamic Iteration Schemes
Index
Christian Constanda, holder of the C.W. Oliphant Endowed Chair in Mathematics at the University of Tulsa, is the chairman of the International Consortium for Integral Methods in Science and Engineering (IMSE). He organizes IMSE conferences all over the world, and is the author and editor of 32 books and over 150 journal articles.
This contributed volume collects papers presented at a special session of the conference Computational and Mathematical Methods in Science and Engineering (CMMSE) held in Cadiz, Spain from June 30 - July 6, 2019. Covering the applications of integral methods to scientific developments in a variety of fields, ranging from pure analysis to petroleum engineering, the chapters in this volume present new results in both pure and applied mathematics. Written by well-known researchers in their respective disciplines, each chapter shares a common methodology based on a combination of analytic and computational tools. This approach makes the collection a valuable, multidisciplinary reference on how mathematics can be applied to various real-world processes and phenomena. Computational and Analytic Methods in Science and Engineering will be ideal for applied mathematicians, physicists, and research engineers.